-limit for two-dimensional charged magnetic zigzag domain walls

Abstract

Charged domain walls are a type of domain walls in thin ferromagnetic films which appear due to global topological constraints. The non-dimensionalized micromagnetic energy for a uniaxial thin ferromagnetic film with in-plane magnetization m ∈ S1 is given by align* Eε[m] \ = \ ε\|∇ m\|L22 + 1ε \|m · e2\|L22 + πλ2|ε| \|∇ · (m-M)\| H-122, align* where magnetization in e1-direction is globally preferred and where M is an arbitrary fixed background field to ensure global neutrality of magnetic charges. We consider a material in the form a thin strip and enforce a charged domain wall by suitable boundary conditions on m. In the limit ε 0 and for fixed λ> 0, corresponding to the macroscopic limit, we show that the energy -converges to a limit energy where jump discontinuities of the magnetization are penalized anisotropically. In particular, in the subcritical regime λ ≤ 1 one-dimensional charged domain walls are favorable, in the supercritical regime λ > 1 the limit model allows for zigzaging two-dimensional domain walls.